On restricted arithmetic progressions over finite fields
Abstract
Let A be a subset of pn, the n-dimensional linear space over the prime field p of size at least N (N=pn), and let Sv=P-1(v) be the level set of a homogeneous polynomial map P:pnpR of degree d, and v∈pR. We show, that under appropriate conditions, the set A contains at least c\, N|S| arithmetic progressions of length l≤ d with common difference in Sv, where c is a positive constant depending on , l and P. We also show that the conditions are generic for a class of sparse algebraic sets of density ≈ N-.
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